FDE-ADC^{Prager:2016} is a method to include interactions between an
embedded species and its environment into an ADC($n$) calculation based on
Frozen Density Embedding Theory (FDET).^{Wesolowski:1993, Wesolowski:2008}
FDE-ADC supports ADC and CVS-ADC methods of orders 2s,2x and 3 and regular ADC
job control keywords also apply.

The FDE-ADC method starts with generating an embedding potential using a MP($n$) density for the embedded system (A) and a DFT or HF density for the environment (B). A Hartree-Fock calculation is then carried out during which the embedding potential is added to the Fock operator. The embedded Hartree-Fock orbitals act as an input for the subsequent ADC calculation which yields the embedded properties (vertical excitation energies, oscillator strengths, etc.). Further information on the FDE-ADC method and FDE-ADC job control are described in Section 11.7.1.